On L-Functions of Modular Elliptic Curves and Certain K3 Surfaces

Abstract

Inspired by Lehmer's conjecture on the nonvanishing of the Ramanujan τ-function, one may ask whether an odd integer α can be equal to τ(n) or any coefficient of a newform f(z). Balakrishnan, Craig, Ono, and Tsai used the theory of Lucas sequences and Diophantine analysis to characterize non-admissible values of newforms of even weight k≥ 4. We use these methods for weight 2 and 3 newforms and apply our results to L-functions of modular elliptic curves and certain K3 surfaces with Picard number 19. In particular, for the complete list of weight 3 newforms fλ(z)=Σ aλ(n)qn that are η-products, and for Nλ the conductor of some elliptic curve Eλ, we show that if |aλ(n)|<100 is odd with n>1 and (n,2Nλ)=1, then align* aλ(n) ∈ \,& \-5,9, 11,25, 41, 43, -45,47,49, 53,55, 59, 61, 67\\\ & \,\,\, \, \-69, 71, 73,75, 79,81, 83, 89, 93 97, 99\. align* Assuming the Generalized Riemann Hypothesis, we can rule out a few more possibilities leaving align* aλ(n) ∈ \-5,9, 11,25,-45,49,55,-69,75, 81, 93, 99\. align*